Arithmetic Sequences Finding the nth Term

1. Arithmetic SequencesFinding the nth Term

2. Arithmetic Sequences • A pattern where all numbers are related by the same common difference. • The common difference must be an addition or subtraction constant. • The common difference can be used to predict future numbers in the pattern. • Ex. 4, 7, 10, 13, ___, ___, ___ The common difference in this pattern is +3. Based on this information, you can say that the next 3 terms will be 16, 19, and 22. Ex. -1, -5, -9, ___, ___, ___ The common difference in this pattern is -4. Based on this information, you can say that the next 3 terms will be -13, -17, and -21.

3. Finding the nth Term • If you want to find a term in an arithmetic sequence that is far into the pattern, there is a formula to use. an = a1 + (n – 1)(d) an = the answer term you are looking for in the sequence a1 = the first term in the sequence n = the ordinal number term you are looking for in the sequence d = the common difference Ex. 23, 18, 13, 8, … find the 63rd term an = 23 + (63 – 1)(-5) an = 23 + 62(-5) an = 23 + (-310) = -287

4. Practice Problems • 11, 13, 15, 17, … Find the 85th term • 25, 22, 19, 16, … Find the 50th term • a1 = -15 d = +4 Find the 71st term • an = 255 d = +3 a1 = 36 Find n